Banach algebra of functionals over paths in abstract Wiener space (Q2706491)

An existence theorem is proved for the operator-valued function space integral \(K^t_\lambda(F)\) over paths in the abstract Wiener space. The conditions are more general than in [\textit{G. W. Johnson} and \textit{M. L. Lapidus}, Mem. Am. Math. Soc. 351, 78 p. (1986; Zbl 0638.28009)] and in [\textit{K. S. Ryu}, J. Korean Math. Soc. 29, No. 2, 317-331 (1992; Zbl 0768.28005)], though the attention is restricted to real \(\lambda>0\) (this restriction is not made in [\textit{K. S. Ryu}, loc. cit.]). It is shown that the integral can be disentangled by a time ordered perturbation expansion or generalized Dyson series.